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Home Beginning Research | Action Research | Case Study | Interviews | Observation Techniques | Education Research in the Postmodern Evaluation Research in Education | Narrative| Presentations | Qualitative Research | Quantitative Methods | Questionnaires | Writing up Research Quantitative Methods in Education Research Prepared by Professor John Berry © J Berry, Centre for Teaching Mathematics, University of Plymouth, 2005 (links updated August 2006) CONTENTS A. INTRODUCTION B. QUANTITATIVE AND QUALITATIVE RESEARCH C. INGREDIENTS OF QUANTITATIVE RESEARCH D. STATISTICS E. STATISTICAL CONCEPTS & QUANTITATIVE PROCEDURES F. TASKS G. FURTHER READING H. WEBSITES A. INTRODUCTION This component is unable to do more than help you to begin thinking about quantitative methods in educational research. Its aim is to give you an insight into the issues should you choose quantitative methods as part of your research methodology. We will briefly address the following questions: What are quantitative methods? What are the ingredients of quantitative methods? How do you go about research design? Education research has moved away largely from the numbers approach in recent years, and the emphasis has been on qualitative methods. However, the use of numbers can be a very useful tool, either as part of a larger project that employs many different methods or as a basis for a complete piece of work. With the use of sophisticated software packages such as SPSS it is relatively easy to deal with the computation side of things and it is possible to come up with numerous tables and charts almost instantly once your data is installed. However, it is very important that the underlying principles of statistical analysis are understood if sense is to be made of the results spewed out by such a package in terms of your research. This component consists of two sections; we begin with an overview of quantitative methods and finish with a brief introduction to some of the basic statistical concepts to be looking for when you read research papers that use quantitative methods of research. Back to CONTENTS list B. QUANTITATIVE AND QUALITATIVE RESEARCH In simple terms we can think of two approaches to investigations in educational research: qualitative and quantitative. In the former we use words to describe the outcomes and in the latter we use numbers. Quantitative research methods were originally developed in the natural sciences to study natural phenomena. However examples of quantitative methods now well accepted in the social sciences and education include: surveys; laboratory experiments; formal methods such as econometrics: numerical methods such as mathematical modelling. Qualitative research methods were developed in the social sciences to enable researchers to study social and cultural phenomenon. Examples of qualitative methods include: action research aims to contribute both to the practical concerns of people in an immediate problematic situation and to the goals of social science by joint collaboration within a mutually acceptable ethical framework; case study research - a case study is an empirical enquiry that investigates a contemporary phenomenon within its reallife context; ethnography- the ethnographer immerses her/himself in the life of people s/he studies and seeks to place the phenomena studied in its social and cultural context. Other components of this module cover various qualitative research methods. Structure of Research Papers When setting out on educational research you will be (have been) encouraged by your supervisor to read appropriate publications and this is a good way of identifying the methods of research that seem most used in your research area. A typical structure for a research paper is summarised in the table below: literature survey other people’s work methodology qualitative or quantitative results your work discussion/conclusions your discussion and reference to others Table 1 Structure of typical research paper Activity 1 Scan read the following three papers: Mark Cosgrove: A study in science-in-the-making as students generate an analogy for electricity. International Journal of Science Education. 17 No 3, pp 295-310, 1995 Susan Picker: Using Discrete Mathematics to give Remedial Students a Second Chance. DIMACS, 36, pp 35-41, 1997 John Berry and Pasi Sahlberg: Investigating Pupils' Ideas of Learning. Learning and Instruction. 6 No 1, pp 19-36, 1996 Identify the research method being used in each paper. Answer the question 'Why use numbers in education research?' with reference to these examples. Back to CONTENTS list C. INGREDIENTS OF QUANTITATIVE RESEARCH As part of your research you will be looking at certain characteristics (variables) and endeavouring to show something interesting about how they are distributed within a certain population. The nature of your research will determine the variables in which you are interested. A variable needs to be measured for the purpose of quantitative analysis. We may collect data concerning many variables, perhaps through a questionnaire, or choose to measure just two or several variables by observation or testing. The variables we are interested in may be dependent or independent. There will be other features present in the problem that may be constant or confounding. Using the data that you have collected then you can: Describe variables in terms of distribution: frequency, central tendency and measures and form of dispersion. Descriptive statistics include averages, frequencies, cumulative distributions, percentages, variance and standard deviations, associations and correlations. Variables can be displayed graphically by tables, bar or pie charts for instance. This may be all the statistics you need and you can make deductions from your descriptions. In fact univariate (one variable) analysis can only be descriptive. But descriptive statistics can be used to describe a significant relationship between two variables (bivariate data) or more variables (multivariate). Infer significant generalisable relationships between variables. The tests employed are designed to find out whether or not your data is due to chance or because something interesting is going on. See the section on Variablesin The Research Methods Knowledge Base. Often it is not possible to undertake a true experiment as part of your research and a common research approach in educational research is called quasi-experimental design represented in the following diagram: Experimental Group O1 Control Group O3 X O2 O4 In this figure O1 and O3 represent initial testing of the two groups; X represents some intervention or experimentation strategy with one of the groups and O2 and O4 represent final testing of the two groups. We would use the test results to investigate whether the experimental teaching approach has led to an improvement in the feature being tested. Back to CONTENTS list D. STATISTICS Perhaps the best way to begin to appreciate the kind of statistics that you might employ in your own research is to have a look at what others have done. Read the paper by John Berry and Pasi Sahlberg: Investigating Pupils' Ideas of Learning. Learning and Instruction. 6 No 1, pp 1936, 1996 and attempt to identify the statistics that are used. The section ‘Findings’ on pages 28 – 32 contains some of the important measures that we use in quantitative research methods. The mean and standard deviation tell us about the average and spread of the data. The bar graphs on page 31 allow a visual comparison of the means between the two groups of samples. The symbol ‘p’ represents the probability of a significant difference between the two groups. This is probably the most difficult concept to grasp because in some senses it is counter intuitive. The probability of an event happening lies between 0 and 1. A large probability (i.e. p close to 1) implies a high likelihood of the event happening. For example if you are told that there is a 95% chance of winning a game (p = 0.95) then put your money on winning! On the other hand if there is a 5% chance of you winning (p = 0.05) it’s probably best not to bet on yourself! So if p is small (close to 0) the event is less likely to happen than if p is large (close to 1). Let’s see what this means in the context of educational research. As an example look at page 31 Berry and Sahlberg. If we compare the means of the scores of the UK and Finland pupils for the statement "I learn better by doing work by myself than by watching the teacher", then there is a probability of less than 0.001 (i.e. 0.1%) that the difference in the means will occur by chance. In ordinary language the probability of it happening by chance is so small that we say it is a significant result. Because it is unlikely to occur, the reason that it does is significant. In our analysis we look for small probabilities usually less than 5% or p = 0.05. Then we say that the result is significant at the 5% level of significance. There is also evidence from Figure 3 that there is some difference between the UK and Finland pupils. For Q2 the UK rating is positive and the Finland rating is negative. Very often a comparison of the means as in Figure 3 is a clue. For example look at Q7 in Figure 3. For the UK pupils the rating is positive whereas for the Finland pupils it is negative. The ‘p – value’ for this feature is less than 0.001 (0.1%) and so we conclude that there is a significant difference between the two groups of pupils for the statement "I like most teachers in my school". One of the first steps in the design of a piece of quantitative research is setting up what is called a hypothesis. For example, we might propose the hypothesis that there is no difference between the UK pupils and Finnish pupils views of their teachers (item 7 in Berry and Sahlberg). This is called the null hypothesis. We then need to use the pupil responses to try to disprove this hypothesis. To be able to compare quantities we need to define a statistic whose distribution is known. In the paper by Berry and Sahlberg the t-statistic is used as a measure of the difference between the means of the two groups of pupils. Having calculated the value of the t-statistic for the feature under investigation we then look up in tables the probability of the feature occurring. (At this stage don’t worry about how it is calculated!) You can see on page 31 the t-statistic and its associated p-value. At the heart of quantitative research methods is some very sound statistical theory. If you are planning to carry out a research investigation using quantitative research methods you do not need a thorough grounding in this theory but you will need an understanding of the statistical methods. We use statistical software packages to do the arithmetical calculations so the important skill is not doing the mathematics but is interpreting the results. In what follows we have gathered together some of the essential statistical ideas needed for quantitative research. It is a summary with some examples to provide a flavour of the ideas. Back to CONTENTS list E. STATISTICAL CONCEPTS & QUANTITATIVE PROCEDURES NB What follows is merely an introductory overview of some of the relevant concepts and procedures. To find out more go first to a general textbook such as Denscombe (1998), Chapter 10, and then, for a much fuller account, try Peers (1996). 1. Variables numerical measurements: person’s age or weight; size of a family non-numerical measurements: position on a scale indicating a level of agreement e.g. Likert rating scale continuous data: measurement that can, in principle, take any value within a certain range e.g. time, age and weight categorical data: (or discrete data): measurements that can take only known discrete values e.g. the number of rooms in a house, the number of children in a family o nominal data: numerical values are assigned to categories as codes e.g. in coding a questionnaire for computer analysis, the response ‘male’ might be coded as ‘1’; and ‘female’ as ‘2’. No mathematical analysis is usually possible and no ordering is implied. o ordinal data: numerical values are assigned in accordance with a qualitative scale e.g. in coding a questionnaire for computer analysis, the responses ‘very good’, ‘good’, ‘poor’ and ‘very poor’ are coded ‘4’, ‘3’, ‘2’ and ‘1’ respectively. See also the section on Variables in The Research Methods Knowledge Base. 2. Basic Measures mean: is a measure of the central location or average of a set of numbers, e.g. the mean of 2 7 2 1 8 2 6 9 10 5 1 4 is 4.75 standard deviation: is the square root of the variance!! variance: is a measure of dispersion (or spread) of a set of data calculated in the following way: 3. median: is the centre or middle number of a data set, e.g. the median of 2 7 2 1 8 2 6 9 10 5 1 4 is 4.5 quartiles: divide a distribution of values into four equal parts. The three corresponding values of the variable are denoted by Q1, Q2 (equal to the median) and Q3 range: is a measure of dispersion equal to the difference between the largest and smallest value. Frequency Distribution Example A A new hybrid apple is developed with the aim of producing larger apples than a particular previous hybrid. In a sample of 1000 apples, the distribution of weights was as follows: Weight (g) 0-50 50100 100150 150200 200250 250300 300350 350-400 frequency 20 42 106 227 205 241 106 53 1. Apples can only be sold to a particular supermarket with a weight greater than 150g. What proportion of the new hybrid apples would be rejected by this supermarket. 2. How many grams above this weight of 150 g is the mean weight of apples? 3. What is this difference in weights in units of the standard deviation of apple weights? Suppose that we graph the data using columns to show the amount in each group. We get a frequency distribution. From the data there are 168 apples whose weight is less than 150 g and 832 apples whose weight is greater than 150 g. There are 1000 apples altogether. We can deduce that the proportion sold to the supermarket. = 16.8 % cannot be The mean weight of the apples is 223.35 g and the standard deviation is 78.9 g. The difference in weight between 150 g and the mean is 73.35 g and this is 4. of a standard deviation. Measures of Location and Dispersion A distribution is symmetrical if the difference between the mean and the median is zero. An appropriate pictorial representation of the data, (histogram, stem and leaf diagram etc.) would produce a mirror image about the centre: A distribution is positively skewed (or skewed to the right) if the mean - median is greater than zero. Such data when represented by a histogram would have a right tail that is longer than the left tail: A distribution is negatively skewed (or skewed to the left) if the mean - median is less than zero. Such data when represented by a histogram would have a left tail that is longer than the right tail: If data are skewed then the best measure of location is the median and the best measure of dispersion is the interquartile range. If data are symmetrical then the best measure of location is the mean and the best measure of dispersion is the standard deviation or variance. 5. Probability This is an important concept in statistics and is an important part of our story. It is defined in the following way: if an experiment has n equally likely outcomes and q of them are the event E, then the probability of the event E, P(E), occurring is P(E) = Some simple examples: the probability of getting a head from the toss of a fair coin is the probability of getting a six from the throw of a fair die is the probability of getting the ace of spades from cutting of a pack of cards is The smaller the probability the more unlikely the event is to happen. This is an important concept in quantitative methods in education research as we shall see. There is an important link between probability and the frequency distribution. Consider again the hybrid apple example above. We saw that the proportion of apples weighing less than 150 grams was 0.168. If we pick up one of the apples ‘at random’ then it could weigh less than 150 g and be rejected or it could weigh more than 150 g and be accepted by the supermarket. The probability of picking such an apple is 0.168. Exercise To illustrate this idea further complete the following: the probability of picking an apple in the weight range 200250 g is the probability of picking an apple in the weight range 350400 g is the probability of picking an apple with a weight greater than 300 g is The important idea here is that the probability is associated the amount of data under the distribution graph. 6. Testing an hypothesis There are two basic concepts to grasp before starting out on testing an hypothesis. Firstly, the tests are designed to disprove hypotheses. We never set out to prove anything; our aim is to show that an idea is untenable as it leads to an unsatisfactorily small probability. Secondly, the hypothesis that we are trying to disprove is always chosen to be the one in which there is no change. For example there is no difference between the two population means. This is referred to as the null hypothesis and is labelled H0. The conclusions of a hypothesis test lead either to acceptance of the null hypothesis or its rejection in favour of the alternative hypothesis H1. Hypothesis testing: a hypothesis test or significance test is a rule that decides on the acceptance or rejection of the null hypothesis based on the results of a random sample of the population under consideration. step 1: Formulate the practical problem in terms of hypotheses. The null hypothesis needs to be very simple and represents the status quo, i.e. there is no difference between the processes being tested. step 2. Calculate a statistic that is a function purely of the data. All good statistics should have two properties: (i) they should tend to behave differently when H0 is true from when H1 is true; and (ii) its probability distribution should be calculable under the assumption that H0 is true. step 3: Choose a critical region. We must be able to decide on the kind of values of the test statistic, which will most strongly point to H1 being true rather than H0. The value of the test statistic in this critical region will lead us to reject H0 in favour of H1; otherwise we are not able to reject H0 in favour of H1. We should never conclude by accepting H0. step 4: Decide the size of the critical region. i.e. a 1% probability of H0 being rejected etc. For more on this see the section on Hypotheses in The Research Methods Knowledge Base. Example B In an educational research programme two groups of students are taught a topic in different ways. An experimental group uses a spreadsheet to explore the topic and a control group uses a more traditional pen and paper activity. Each group contains 20 students. At the end of the topic the teacher tests the two groups on their understanding of the topic and obtains the following data: Experimental 5 11 25 33 35 40 45 46 52 55 56 56 57 59 69 74 75 89 92 97 Control 33 39 44 45 45 46 47 48 49 49 53 54 54 55 58 60 61 63 65 69 Extra data: mean standard deviation Experimental 53.6 25.0 Control 51.8 9.1 Experimental Group Control Group How would you interpret these findings? Some analysis The researcher might be tempted to conclude that the experiment has had little or no effect on the performance of the experimental group as judged by the means. However the large difference in standard deviations might suggest that the experimental group is much more variable in performance than the control group. The researcher might also be tempted to deduce that the experiment has turned some of the pupils off the task. Look at the three low scores! Suppose that we investigate the difference in the means: Let H0: there is no difference between the means of the two groups: m 1 = m 2 H1: the score of the experimental group is greater than the score of the control group: m 1 >m 2 We use a two-sample t-test to get The p value is 0.39 (39%) so we deduce that there is not enough evidence to reject the null hypothesis. The researcher could not deduce that there was an improvement in student performance. 7. Statistical tests t tests In hypothesis testing, the t test is used to test for differences between means when small samples are involved. (n £ 30 say). For larger samples use the z test. The t test can test i) if a sample has been drawn from a Normal population with known mean and variance. (Single sample) ii) if two unknown population means are identical given two independent random samples. (Two unpaired samples) iii) if two paired random samples come from the same Normal population. (Two paired samples (paired differences)) Any hypothesis test can be one tailed or two tailed depending on the alternative hypothesis, H1. Consider the null hypothesis, H0: m =3 A one tailed test is one where H1 would be of the form m > 3. A two-tailed test is one where H1 would be of the form m ¹ 3. Click here for more information on t-tests. Single sample test Let X1, X2, ¼ , Xn be a random sample with mean and variance s2. To test if this sample comes from a Normal population with known mean m and unknown variance s2, the test statistic is used to test the null hypothesis H0: the population mean equals m. If the test statistic lies in the critical region whose critical values are found from the distribution of Tn, a, H0 is rejected in favour of the alternative hypothesis H1. n are the degrees of freedom and for a single sample test n = n-1, and a is the significance level of the test. Two unpaired samples Let X1, X2, ¼ , Xm be a random sample with mean and variance sx2 drawn from a Normal population with unknown mean mx and unknown variance sx2. Let Y1, Y2, ¼ , Yn be a random sample with mean and variance sy2 drawn from a Normal population with unknown mean my and unknown variance sy2. To test the null hypothesis that the two unknown population means are the same we use the test statistic where standard deviation. , the estimate of the common population The test statistic T is distributed Tn, where n =(m-1)+(n-1) for two unpaired samples. If the test statistic lies in the critical region whose critical values are found from the distribution of Tn, a, H0 is rejected in favour of the alternative hypothesis H1. Example C It is claimed that the concentration period of students doing a particular task is normally distributed with mean 44mins. A sample of 21 students were taken, and their concentration period measured. The mean time of the sample was found to be 42mins and the sample variance was calculated to be 36min. Is there any evidence at the 5% level of significance against the claim that the population mean is 44min? Solution Here m = 44, = 42, s = Ö 36 = 6 and n = 21. This is a two-tailed test since we are looking for any difference. H0: m = 44 H1: m ¹ 44 Since p = 0.1423 = 14.23% there is insufficient evidence to reject the null hypothesis. We therefore conclude that the population mean concentration period is 44 minutes. Example D A researcher investigating the effects of pollution on two rivers takes an independent random sample of fish of a certain species from each river, measures their mass in ounces and obtains the following results. River 1 20 10 17 7 10 18 River 2 14 6 10 8 9 7 7 6 8 Test at the 5% level of significance if there is any evidence of a difference in the mean weight between the two rivers. Solution Assume that each sample is taken from a normal population. Here m = 6, n = 9, = 13.667, sx2 = 23.556 = 8.333, sy2 = 5.556. Let m 1 be the population mean of river 1, and m population mean of river 2. H0: m 1 =m H1: m 1 ¹m 2 be the 2 2 Since p = 0.043 = 4.3% < 5% we deduce that there is sufficient evidence to reject the null hypothesis at the 5% level of significance. We therefore conclude that the mean weight of fish in River 1 is not equal to the mean weight of fish in River 2. Back to CONTENTS list F. TASKS (NB: only for those University of Plymouth students undertaking the ‘Research in Education’ module as part of the preparation for the submission of a MA dissertation proposal) Tasks, once completed, should be sent to [email protected], making clear: which component it is from; which task it is (A, B or C); the name of your dissertation supervisor. It will then be passed on to the component leader (and copied to your supervisor). The component leader will get back to you with comments and advice which we hope will be educative and which will help you in preparing your dissertation proposal once you are ready. (Remember that these tasks are formative and that it is the proposal which forms the summative assessment for the MERS501 (resined) module.) This email address is checked daily so please use it for all correspondence about RESINED other than that directed to particular individuals for specific reasons. TASK A (NATURE OF EDUCATION RESEARCH) Does research have to be quantitative to be scientific? See Cohen et al (2000), Chapter 1, and the section on Positivism and Post-Positivism in Trochim (2000), examine the terms used in this question and discuss with reference to examples. TASK B (DATA COLLECTION) A research group suspects that girls and boys adopt different styles of working when using ICT in mathematics lessons. Outline a quantitative research method to investigate the effect of gender on the use of calculators on children’s understanding of mathematics. What are your variables? Formulate an experimental hypothesis for the research.What features might cause problems in your research? TASK C (DATA ANALYSIS) Twelve students fail an examination. After a period of revision and tutorial support they resit by taking a new examination. The marks for the original examination and the resit are shown in the table below. Student number 1 2 3 4 5 6 7 8 9 10 11 12 Examination score 30 31 20 17 25 32 35 29 30 27 32 30 Resit score 42 38 30 21 40 45 31 32 38 50 34 40 What would you do with the data now? Back to CONTENTS list G. FURTHER READING Blaxter, I., Hughes C. and Tight M. (1996) How to Research. Buckingham, Open University Press. Bryman, A. and Cramer D. (1999) Quantitative Data Analysis with SPSS 8 Release for Windows: a guide for social scientists. London, Routledge. Cohen, L ; Manion, L & Morrison, K (2000) Research Methods in Education (5th edition). London, RoutledgeFalmer. Denscombe, M. (1998) The Good Research Guide. Buckingham, Open University Press. Greenfield, Tony (ed) (1996) Research Methods – Guidance for Postgraduates. London, Arnold. Kanji, Gopal (1993) 100 Statistical Tests. London, SAGE Publications. Peers, Ian (1996) Statistical Analysis for Education & Psychology Researchers. London, Falmer. Plewis, Ian (1997) Statistics in Education. London, Arnold. Robson, C. (1990) Experiment, Design and Statistics in Psychology. Middlesex, Penguin Books. Rose, D. and Sullivan, O. (1993) Introducing Data Analysis for Social Scientists. Buckingham, Open University Press. MORE ADVANCED READING http://www.cf.ac.uk/socsi/capacity/References.html H. WEBSITES Trochim, William M. The Research Methods Knowledge Base, 2nd Edition. Internet WWW page, at URL: http://www.socialresearchmethods.net/kb/ (version current as of ). (This is the excellent site referred [and linked] to several times in the sections presented above.) SURFSTAT australia http://www.anu.edu.au/nceph/surfstat/surfstathome/surfstat.html Electronic Statistics Textbook http://www.statsoft.com/textbook/stathome.html Back to CONTENTS list Home Beginning Research | Action Research | Case Study | Interviews | Observation Techniques | Education Research in the Postmodern Evaluation Research in Education | Narrative| Presentations | Qualitative Research | Quantitative Methods | Questionnaires | Writing up Research © J Berry, Centre for Teaching Mathematics, University of Plymouth, 2005